Electrical energy & Capacitance

1. Electrical energy & Capacitance

2. work… • previously… A force is conservative if the work done on an object when moving from A to B does not depend on the path followed. Consequently, work was defined as: W=PEi-PEf=-PE • this was derived for a gravitational force, but as we saw in the previous chapter, gravitational and Coulomb forces are very similar: Fg=Gm1m2/r122 with G=6.67x10-11 Nm2/kg2 Fe=keq1q2/r122 with ke=8.99x109 Nm2/C2 Hence: The Coulomb force is a conservative force Electrical Energy & Capacitance

3. consider a charge +q moving in an E field from A to B over a distance D. We can ignore gravity (why?) What is the work done by the field? What is the change in PE? If initially at rest, what is its speed at B? WAB=Fdcos with  the angle between F and direction of movement, so WAB=Fd WAB=qEd (since F=qE) work done BY the fieldON the charge (W is positive) PE=-WAB=-qEd : negative, so the potential energy has decreased Conservation of energy: PE+KE=0 KE=1/2m(vf2-vi2) 1/2mvf2=qEd v=(2qEd/m) work & potential energy Electrical Energy & Capacitance

4. Consider the same situation for a charge of –q. Can it move from A to B without an external force being applied, assuming the charge is initially (A) and finally (B) at rest? WAB=-qEd ; negative, so work must be done by the charge. This can only happen if an external force is applied Note: if the charge had an initial velocity the energy could come from the kinetic energy (I.e. it would slow down) If the charge is at rest at A and B: external work done: -qEd If the charge has final velocity v then external work done: W=1/2mvf2+|q|Ed work & potential energy II Electrical Energy & Capacitance

5. Conclusion • In the absence of external forces, a positive charge placed in an electric field will move along the field lines (from + to -) to reduce the potential energy • In the absence of external forces, a negative charge placed in an electric field will move along the field lines (from - to +) to reduce the potential energy +++++++++++++ -------------------- Electrical Energy & Capacitance

6. question • a negatively charged (-1 C) mass of 1 g is shot diagonally in an electric field created by a negatively charge plate (E=100 N/C). It starts at 2 m distance from the plate and stops 1 m from the plate, before turning back. What was the initial velocity in the direction along the field lines? Y 2m 1m ---------------------- X Electrical Energy & Capacitance

7. answer • Note: the direction along the surface of the plate does not play a role(there is no force in that direction!) Kinetic energy balance • Initial kinetic energy: 1/2mv2=0.5*0.001*(vx2+vy2) • Final (at turning point) kinetic energy: 0.5*0.001*vx2 • Change in kinetic energy: KE=-0.5*0.001*vy2 =-5x10-4vy2 Potential energy balance • Change in Potential energy: PE=-qEd=1x10-6*100*1=+10-4 J • Conservation of energy:PE+KE=0 so -5x10-4vy2+10-4=0 • vy=0.44 m/s Electrical Energy & Capacitance

8. Electrical potential • The change in electrical potential energy of a particle of charge Q in a field with strength E over a distance d depends on the charge of the particle: PE=-QEd • For convenience, it is useful to define the difference in electrical potential between two points (V), that is independent of the charge that is moving: V= PE/Q=-|E|d • The electrical potential difference has units [J/C] which is usually referred to as Volt ([V]). It is a scalar • Since V= -Ed, so E= -V/d the units of E ([N/C] before) can also be given as [V/m]. They are equivalent, but [V/m] is more often used. Electrical Energy & Capacitance

9. Electric potential due to a single charge V V=keq/r • the potential at a distance r away from a charge +q is the work done in bringing a charge of 1 C from infinity (V=0) to the point r: V=keq/r • If the charge that is creating the potential is negative (-q) then V=-keq/r • If the field is created by more than one charge, then the superposition principle can be used to calculate the potential at any point r + 1C Electrical Energy & Capacitance

10. example 1 2 1 m -2 C +1C r • what is the electric field at a distance r? • what is the electric potential at a distance r? • E=E1-E2=ke(Q1/r2)-ke(Q2/[1-r]2)=ke(1/r2)-ke(-2/[1-r]2)= ke(1/r2+2/[1-r]2) Note the -: E is a vector • V=V1+V2=ke(Q1/r)+ke(Q2/[1-r])=ke(1/r-2/[1-r]) Note the +: V is a scalar Electrical Energy & Capacitance

11. - + + question • a proton is moving in the direction of the electric field. During this process, the potential energy …… and its electric potential …… • increases, decreases • decreases, increases • increases, increases • decreases, decreases PE=-WAB=-qEd, so the potential energy decreases (proton is positive) V= PE/q, so the electric potential that the proton feels decreases Note: if the proton were exchanged for an electron moving in the same direction, the potential energy would increase (electron is negative), but the electric potential would still decrease since the latter is independent of the particle that is moving in the field Electrical Energy & Capacitance

12. equipotential surfaces compare with a map Electrical Energy & Capacitance

13. A capacitor +++++++++++++ +Q • is a device to create a constant electric field. The potential difference V=Ed • is a device to store charge (+ and -) in electrical circuits. • the charge stored Q is proportional to the potential difference V: Q=CV • C is the capacitance, units C/V or Farad (F) • very often C is given in terms of F (10-6F), nF (10-9F), or pF (10-12F) • Other shapes exist, but for a parallel plate capacitor: C=0A/d where 0=1/(4 pi k) = 8.85x10-12F/m and A the area of the plates symbol for capacitor when used in electric circuit d -Q -------------------- Electrical Energy & Capacitance

14. electric circuits: batteries • The battery does work (e.g. using chemical energy) to move positive charge from the – terminal to the + terminal. Chemical energy is transformed into electrical potential energy. • Once at the + terminal, the charge can move through an external circuit to do work transforming electrical potential energy into other forms Symbol used in electric circuits: + - Electrical Energy & Capacitance

15. Our first circuit 10nF • The battery will transport charge from one plate to the other until the voltage produced by the charge build-up is equal to the battery charge • example: a 12V battery is connected to a capacitor of 10 nF. How much charge is stored? • answer Q=CV=10x10-9 x 12V=120 nC • NOTE, Q on one plate, -Q on the other (total is 0, but Q is called “the charge”)! • if the battery is replaced by a 300 V battery, and the capacitor is 2000F, how much charge is stored? • answer Q=CV=2000x10-6 x 300V=0.6C • We will see later that this corresponds to 0.5CV2=90 J of energy, which is the same as a 1 kg ball moving at a velocity of 13.4 m/s 12V Electrical Energy & Capacitance

16. capacitors in parallel C1=10nF At the points the potential is fixed to one value, say 12V at A and 0 V at B This means that the capacitances C1 and C2 must have the same Voltage. The total charge stored is Q=Q1+Q2. • We can replace C1 and C2 with one equivalent capacitor: Q1=C1V & Q2=C2V is replaced by: Q=CeqV since Q=Q1+Q2 , C1V+C2V=CeqV so: • Ceq=C1+C2 • This holds for any combination of parallel placed capacitances Ceq=C1+C2+C3+… • The equivalent capacitance is larger than each of the components A C2=10nF B 12V Electrical Energy & Capacitance

17. capacitors in series A B The voltage drop of 12V is over both capacitors. V=V1+V2 The two plates enclosed in are not connected to the battery and must be neutral on average. Therefore the charge stored in C1 and C2 are the same • we can again replace C1 and C2 with one equivalent capacitor but now we start from: V=V1+V2 so, V=Q/C1+Q/C2=Q/Ceq and thus: 1/Ceq=1/C1 + 1/C2 • This holds for any combination of in series placed capacitances 1/Ceq=1/C1+1/C2+1/C3+… • The equivalent capacitor is smaller than each of the components C1=10nF C2=10nF 12V Electrical Energy & Capacitance

18. The smallest possible is by putting the three in series: 1/Ceq=1/C1+1/C2+1/C3=1+1+1=3 so Ceq=1/3 nF question • Given three capacitors of 1 nF, an capacitor can be constructed that has minimally a capacitance of: • 1/3 nF • 1 nF • 1.5 nF • 3 nF Electrical Energy & Capacitance

19. C4 C3 C5 C6 C2 C1 12V Fun with capacitors: what is the equivalent C? STRATEGY: replace subgroups of capacitors, starting at the smallest level and slowly building up. • step 1: C4 and C5 and C6 are in parallel. They can be replaced by once equivalent C456=C4+C5+C6 Electrical Energy & Capacitance

20. step II C3 • C3 and C456 are in series. Replace with equivalent C: 1/C3456=1/C3+1/C456 so C3456=C3C456/(C3+C456) • C1 and C2 are in series. Replace with equivalent C: 1/C12=1/C1+1/C2 so C12=C1C2/(C1+C2) C456 C2 C1 12V Electrical Energy & Capacitance

21. step III C3456 • C12 and C3456 are in parallel, replace by equivalent C of C123456=C12+C3456 C123456 C12 12V 12V Electrical Energy & Capacitance

22. problem C4 A B C3 • V12=V345=12V • C45=C4+C5=10nF+20nF=30nF • C345=C3C45/(C3+C45)=300/40=7.5nF • Q345=V345C345=12V*7.5nF=90nC • Q45=Q345 • V45=Q45/C45=90nC/30nF=3V • check V3=Q3/C3=Q345/C3=90nC/10nF=9V V3+V45=12V okay! C1=10nF C2=20nF C3=10nF C4=10nF C5=20nF C5 C2 C1 What is Vab? 12V Electrical Energy & Capacitance

23. energy stored in a capacitor +Q +++++++++++++ V • the work done transferring a small amount Q from – to + takes an amount of work equal to W=VQ • At the same time, V is increased, since V=(Q+Q/C) • The total work done when moving charge Q starting at V=0 equals: W=1/2QV=1/2(CV)V=1/2CV2 • Therefore, the amount of energy stored in a capacitor equals: EC=1/2 C V2 V Q -Q -------------------- Q Electrical Energy & Capacitance

24. example • A parallel-plate capacitor is constructed with plate area of 0.40 m2 and a plate separation of 0.1mm. How much energy is stored when it is charged to a potential difference of 12V? answer: First calculate C=0A/d=8.85x10-12 x 0.40 / 0.0001=3.54x10-8 F Energy stored: E=1/2CV2=0.5x3.54x10-8x122=2.55x10-6 J Now let’s assume a 2000F capacitor being charged with a 300V battery: E=1/2CV2=90J This is similar to a ball of 1 kg being fired at 13.4 m/s!! Electrical Energy & Capacitance

25. capacitors II +++++++++++++ +Q A material  vacuum 1.00000 air 1.00059 glass 5.6 paper 3.7 water 80 • the charge density of one of the plates is defined as: =Q/A • The equation C=0A/d assumes the area between the plates is in vacuum (free space) • If the space is replaced by an insulating material, the constant 0 must be replaced by 0 where  (kappa) is the dielectric constant for that material, relative to vacuum • Therefore: C=0A/d d -Q -------------------- Electrical Energy & Capacitance

26. why does inserting a plate matter? • molecules, such as water, can/is be polarized • when placed in an E-field, the orient themselves along the field lines; the negative plates attracts the positive side of the molecules • near to positive plate, net negative charge is collected; near the negative plate, net positive charge is collected. • If no battery is connected, the initial potential difference V between the plates will drop to V/. • If a battery was connected, more charge can be added, increasing the capacitance from C to C Electrical Energy & Capacitance

27. problem • An amount of 10 J is stored in a parallel plate capacitor with C=10nF. Then the plates are disconnected from the battery and a plate of material is inserted between the plates. A voltage drop of 1000 V is recorded. What is the dielectric constant of the material? answer: step 1: Ec=1/2CV2 so 10=0.5x 10x10-9 V2, V=44721 V step 2: after disconnecting and inserting the plate, the voltage over the capacitor is equal to Voriginal/  So: (44721-1000)=44721/ =1.023 Electrical Energy & Capacitance

28. answer: Ec=1/2CV2 with C=0A/d. If d increases, C becomes smaller. The charge remains the same and Q=CV. So, if C becomes smaller, V becomes larger by the same factor. Rewrite: Ec=1/2CV2=1/2QV. Since Q is constant and V goes up, Ec must increase. problem • An ideal parallel plate capacitor is connected to a battery and becomes fully charged. The capacitor is then disconnected and the separation between the plates is increased in such a way that no charge leaks off. The energy stored in the capacitor has • increased • decreased • not changed • become zero Electrical Energy & Capacitance

29. Remember • Electric force (Vector!) acting on object 1 (or 2): F=keq1q2/r122 • Electric field (Vector!) due to object 1 at a distance r: E=keq1/r2 • Electric potential (Scalar!) at a distance r away from a charge q1: V=keq1/r Electrical Energy & Capacitance